Cambridge International Examinations Cambridge International Advanced Subsidiary and Advanced Level CANDIDATE NAME *8124433764* CENTRE NUMBER CANDIDATE NUMBER MATHEMATICS 9709/13 Paper 1 Pure Mathematics 1 (P1) May/June 2018 Candidates answer on the Question Paper. Additional Materials: List of Formulae(MF9) 1hour45minutes READ THESE INSTRUCTIONS FIRST WriteyourCentrenumber,candidatenumberandnameinthespacesatthetopofthispage. Writeindarkblueorblackpen. YoumayuseanHBpencilforanydiagramsorgraphs. Do not use staples, paper clips, glue or correction fluid. DONOTWRITEINANYBARCODES. Answer all the questions in the space provided. If additional space is required, you should use the lined page at the end of this booklet. The question number(s) must be clearly shown. Give non-exact numerical answers correct to 3 significant figures, or 1 decimal place in the case of angles in degrees, unless a different level of accuracy is specified in the question. The use of an electronic calculator is expected, where appropriate. You are reminded of the need for clear presentation in your answers. At the end of the examination, fasten all your work securely together. Thenumberofmarksisgiveninbrackets[]attheendofeachquestionorpartquestion. Thetotalnumberofmarksforthispaperis75. This document consists of 20 printed pages. JC18 06_9709_13/RP UCLES2018 [Turn over
2 1 Express 3x 2 12x +7in theforma x +b 2 +c,wherea,bandcareconstants. [3] UCLES 2018 9709/13/M/J/18
3 2 Findthecoefficient of 1 x intheexpansion of x 2 x 5. [3] UCLES 2018 9709/13/M/J/18 [Turn over
4 3 The common ratio of a geometric progression is 0.99. Express the sum of the first 100 terms as a percentage of the sum to infinity, giving your answer correct to 2 significant figures. [5] UCLES 2018 9709/13/M/J/18
5 4 Acurvewithequationy=f x passesthroughthepointa 3, 1 andcrossesthey-axisatb. Itisgiven that f x = 3x 1 1 3. Findthey-coordinateofB. [6] UCLES 2018 9709/13/M/J/18 [Turn over
6 5 A 5cm 6cm O C B The diagram shows a triangle OAB in which angle OAB = 90 and OA = 5cm. The arc AC is part of a circle with centreo. The arc has length 6cm and it meets OB at C. Find the area of the shaded region. [5] UCLES 2018 9709/13/M/J/18
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8 6 The coordinates of points A and B are 3k 1, k +3 and k +3, 3k +5 respectively, where k is a constant(k 1). (i) Find and simplify the gradient of AB, showing that it is independent of k. [2] (ii) Find and simplify the equation of the perpendicular bisector of AB. [5] UCLES 2018 9709/13/M/J/18
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10 7 (a) (i) Express tan2 1 tan 2 +1 inthe formasin2 +b,whereaandbareconstants to befound. [3] (ii) Hence, or otherwise, and showing all necessary working, solve the equation tan 2 1 tan 2 +1 = 1 4 for 90 0. [2] UCLES 2018 9709/13/M/J/18
11 (b) y A y = sinx O x B y = 2cosx The diagram shows the graphs of y = sinx and y = 2cosx for x. The graphs intersect atthepointsaandb. (i) Find the x-coordinate of A. [2] (ii) Find the y-coordinate of B. [2] UCLES 2018 9709/13/M/J/18 [Turn over
12 8 (i) The tangent to the curve y = x 3 9x 2 +24x 12 at a point A is parallel to the line y = 2 3x. Findtheequation ofthetangent ata. [6] UCLES 2018 9709/13/M/J/18
13 (ii) Thefunctionfis definedby f x =x 3 9x 2 +24x 12forx>k,wherekis aconstant. Findthe smallest valueofkforftobean increasingfunction. [2] UCLES 2018 9709/13/M/J/18 [Turn over
14 9 D 7 C B k j 2 E 6 O i 8 A The diagram shows a pyramid OABCD with a horizontal rectangular base OABC. The sides OA and AB have lengths of 8 units and 6 units respectively. The point E on OB is such that OE = 2 units. The point D of the pyramid is 7 units vertically above E. Unit vectors i, j and k are parallel to OA, OC and ED respectively. (i) Show that OE = 1.6i +1.2j. [2] (ii) Use a scalar product to find angle BDO. [7] UCLES 2018 9709/13/M/J/18
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16 10 Theone-one function fis defined by f x = x 2 2 +2 forx c,wherecis aconstant. (i) State the smallest possible value of c. [1] Inparts(ii) and (iii)thevalueofcis 4. (ii) Findan expressionforf 1 x andstatethedomain off 1. [3] UCLES 2018 9709/13/M/J/18
17 (iii) Solvetheequation ff x = 51,givingyour answer intheforma + b. [5] UCLES 2018 9709/13/M/J/18 [Turn over
18 11 y y = x+1 2 + x+1 1 A x = 1 O 1 x The diagram shows part of the curve y = x +1 2 + x +1 1 and the line x = 1. The point A is the minimum point on the curve. (i) Show that the x-coordinate of A satisfies the equation 2 x +1 3 = 1 and find the exact value of d 2 y ata. [5] 2 dx UCLES 2018 9709/13/M/J/18
19 (ii) Find, showing all necessary working, the volume obtained when the shaded region is rotated through 360 about thex-axis. [6] UCLES 2018 9709/13/M/J/18 [Turn over
20 Additional Page If you use the following lined page to complete the answer(s) to any question(s), the question number(s) must be clearly shown................................................................ Permission to reproduce items where third-party owned material protected by copyright is included has been sought and cleared where possible. Every reasonable effort has been made by the publisher(ucles) to trace copyright holders, but if any items requiring clearance have unwittingly been included, the publisher will be pleased to make amends at the earliest possible opportunity. To avoid the issue of disclosure of answer-related information to candidates, all copyright acknowledgements are reproduced online in the Cambridge International Examinations Copyright Acknowledgements Booklet. This is produced for each series of examinations and is freely available to download at www.cie.org.uk after the live examination series. Cambridge International Examinations is part of the Cambridge Assessment Group. Cambridge Assessment is the brand name of University of Cambridge Local Examinations Syndicate(UCLES), which is itself a department of the University of Cambridge. UCLES 2018 9709/13/M/J/18